Arrangement for contactless measurement of the velocity of a moving medium

ABSTRACT

The arrangement for contactless measurement of the velocity of a moving medium comprises two transducers which furnish electrical signals into which inhomogeneities of the moving medium enter depending on their spatial position in accordance with different spatial weighting functions. The detecting regions of the two transducers are offset with respect to each other in the direction of movement of the medium but partially overlap in such a manner that the gradient of the spatial cross correlation function for the spatial displacement zero is different from the zero vector. A correlator forms the time cross correlation function of the two signals and an evaluation circuit derives the measured value for the velocity of the moving medium from the gradient of the time cross correlation function for the time displacement zero. Alternatively, the measured value may also be derived from the first moment of the cross power density spectrum of the two signals because said moment is mathematically equivalent to the gradient of the time cross correlation function of the two signals for the time displacement zero.

The invention relates to an arrangement for the contactless measurement of the velocity of a moving medium comprising two transducers, the detection regions of which are offset with respect to each other in the direction of movement of the medium and which furnish electrical signals into which inhomogeneities of the moving medium enter depending on their spatial position in accordance with different spatial weighting functions, and a means for recovering the measured value by correlative linking of the two signals.

In known measuring arrangement of this type the displacement time corresponding to the maximum of the time correlation function of the output signals of the two transducers is determined and is equal to the traveltime of the inhomogeneities of the medium from the first to the second transducer. When the distance between the transducers is known the velocity to be measured can be derived from the travelling time. This measuring method involves uncertainties in many uses because the measured result depends on the flow profile and because the maximum of the cross correlation function is often not very pronounced so that the location of the maximum cannot be exactly determined. Other contactless measuring methods do not permit the flow direction to be detected and do not give any useful indication for zero velocity and for very small velocities.

The problem underlying the invention is to provide a measuring arrangement of the type set forth at the beginning which for all velocities supplies an accurate measured result independent of the flow profile and the measuring range of which also covers zero velocity, very small velocities and reversal of the direction of movement.

According to the invention this problem is solved in that the detection regions of the two transducers partially overlap in such a manner that the gradient of the spatial cross correlation function of the spatial weighting functions for the spatial displacement zero is different from the zero vector and that the measured value is derived from the gradient of the time cross correlation function of the two signals for the time displacement zero or from the first moment of the cross power density spectrum of the two signals.

The invention is based on the recognition that under certain conditions a measure of the velocity of the moving medium is provided not only by the position of the maximum of the time cross correlation function but also by the gradient thereof for the time displacement zero. Since this measured value is determined for the time displacement zero it originates from inhomogeneities disposed at the same location. This eliminates major causes of inaccuracies in the velocity measurement. Furthermore, the contactless correlative velocity measurement is possible also in cases in which the velocity measurement based on the determination of the maximum of the cross correlation function fails. In particular, it is possible to dispense with runup distances and for example dispose a measuring point directly behind a bend. The measuring range is fundamentally not restricted and in particular includes very slow movements, stationary states and reversal of the direction of movement.

A requirement for the application of this measuring principle is that transducers are used which generate a signal pair in which a non-vanishing gradient exists in the statistical dependence of the two signals not displaced in time. This condition is fulfilled if the detection regions of the two transducers partially overlap in such a manner that the gradient of the spatial cross correlation function of the spatial weighting functions for the spatial displacement zero is different from the zero vector. This definition is an invariable geometric characteristic which depends on the configuration of the transducer and is a distinguishing feature of any transducer pair.

The gradient of the time cross correlation function of two signals for the time displacement zero is mathematically equivalent to the first moment of the cross power density spectrum of said signals. There is thus no difference whether the one or the other value is calculated.

Advantageous embodiments and further developments of the invention are characterized in the subsidiary claims.

Further features and advantages of the invention will be apparent from the following description of examples of embodiment which are illustrated in the drawings, wherein:

FIG. 1 is a schematic representation of a measuring arrangement of known type for contactless correlative measurement of the flow velocity in a pipe,

FIG. 2 shows diagrams of spatial functions which are characteristic of the structure of the measuring arrangement of FIG. 1,

FIG. 3 shows diagrams of time functions which are characteristic of the mode of operation of the measuring arrangement of FIG. 1,

FIG. 4 shows a modified embodiment of the measuring arrangement of FIG. 1 incorporating the principle of the invention,

FIG. 5 represents the diagrams corresponding to FIG. 2 of spatial functions for the measuring arrangement of FIG. 4,

FIG. 6 represents the diagrams of time functions corresponding to FIG. 3 for the measuring arrangement of FIG. 4,

FIG. 7 shows several time cross correlation functions taken with the same measuring arrangement according to the invention for various velocities,

FIG. 8 is an optical measuring arrangement according to the invention,

FIG. 9 is a side view of the optical measuring arrangement of FIG. 8,

FIG. 10 is a capacitive measuring arrangement according to the invention,

FIG. 11 is an optical measuring arrangement according to the invention with a photodiode array,

FIG. 12 is an analog signal processing circuit for recovering the measured value in a measuring arrangement according to the invention and

FIG. 13 is a digital signal processing circuit for recovering the measured value in a measuring arrangement according to the invention.

FIG. 1 shows as an example of the use of the correlative contactless velocity measurement a measuring arrangement for measuring the flow velocity of a medium moving with the velocity v through a pipe 1 in the direction of the pipe axis z. Disposed at the pipe 1 at an exactly known centre spacing D are two transducers W₁ and W₂ which furnish electrical signals S₁ (t) and S₂ (t) respectively which are influenced by inhomogeneities of the moving medium. Depending on the nature and constituency of the moving medium the useful inhomogeneities may be of a very different type but their effect is always based on the fact that they influence or generate either an acoustic or an electromagnetic field. For the methods working with electromagnetic fields the entire spectrum of the electrostatic field through the high-frequency and microwave range and the optical range up to γ radiation can be employed. In the case of acoustic fields the useful frequency range ranges from a few kilohertz in gases up to 10 MHz or more for liquid carrier media.

Generally, each transducer consists of a transmitter which generates the field to be influenced by the inhomogeneities of the medium and a receiver which responds to the field influenced by the inhomogeneities and furnishes an electrical signal representing the time variations of the field. Thus, in FIG. 1 the transducer W₁ consists of a transmitter T₁ and a receiver R₁ and the transducer W₂ consists of a transmitter T₂ and a receiver R₂. The construction of the transmitters and receivers in accordance with the nature of the field utilized is known to the expert. Thus, when using an electrical field lying in the optical range each transmitter may be a light source and each receiver a photodetector. When using an acoustic field lying in the ultrasonic range each transmitter is an ultrasonic generator and each receiver an ultrasonic detector. Capacitive sensors form at the same time transmitters and receivers for electrostatic fields, etc.

When the inhomogeneities are active and themselves generate a useful field the transmitters may be omitted so that each transducer consists only of a receiver. This is for example the case when the inhomogeneities are formed by radioactive particles whose radiation is picked up by the receivers of the transducers and converted to an electrical signal.

In accordance with a predetermined spatial weighting function each inhomogeneity of the moving medium is incorporated into the output signal of a transducer when said inhomogeneity is in the detection region thereof. In the example of embodiment of FIG. 1 the detection region of the transducer W₁ is a measurement volume which in the direction of the z axis has the length L₁ and perpendicularly to the z axis has the cross-section of the pipe 1 or a portion of said cross-section covered by the transducer. In the same manner the detection region of the transducer W₂ is a measurement volume having the length L₂ and a corresponding cross-section. Since generally the aim is to detect the velocity averaged over the pipe cross-section the transducers are constructed as far as possible to implement a uniform weighting of the pipe cross-section.

The diagram A of FIG. 2 shows in ideal representation as function of the coordinate z the spatial weighting function g₁ (z) of the transducer W₁, i.e. the effect of a punctiform inhomogeneity on the output signal of the transducer W₁ in dependence upon its spatial position along the z axis. If the punctiform inhomogeneity is disposed outside the detection region of the transducer W₁ it does not enter the output signal S₁ (t) and the spatial weighting function g₁ (z) has the value 0. When the punctiform inhomogeneity is disposed in the detection region of the transducer W₁ however it enters the output signal S₁ (t) with a predetermined value different from zero so that the spatial weighting function g₁ (z) assumes a value different from zero for the entire detection region.

In corresponding manner the diagram B of FIG. 2 shows the spatial weighting function g₂ (z) of the transducer W₂. If the two transducers W₁ and W₂ are made the same the spatial weighting functicn g₂ (z) has the same curve form as the spatial weighting function g₁ (z) but differs therefrom in its different position with respect to the abscissa axis z. Corresponding to the arrangement of the transducers in FIG. 1 the spatial weighting functions g₁ (z) and g₂ (z) are offset with respect to each other by the amount D and between them there is a gap of magnitude E.

The diagram C of FIG. 2 shows the spatial cross correlation function Φ₁₂ (u) of the spatial weighting functions g₁ (z) and g₂ (z). The spatial cross correlation function has the mathematical form ##EQU1## This means that the values of the weighting function g₂ (z) are multiplied by the values of the spatial weighting function g₁ (z) displaced by a spatial displacement u and the mean value of the products is formed over the region Z evaluated. For each value of the spatial displacement u a discrete value of the spatial correlation function is obtained. The spatial displacement z=0 corresponds to the starting position illustrated in diagrams A and B of the spatial weighting functions, i.e. the spatial location of the transducer W₁ and W₂ of FIG. 2, and increasing values of u correspond to a reduction of the mutual offsetting of the mutually correlated values of the two spatial weighting functions. For u=0 the cross correlation function has the value zero because always at least one of the two values of each value pair multiplied together is zero. At u=E the mutual overlapping of the portions of the two weighting functions different from zero begins and the cross correlation function increases. For u=D the two weighting functions g₁ (z) and g₂ (z) are congruent and the spatial cross correlation function reaches its maximum.

Both the spatial weighting functions g₁ (z), g₂ (z) and their cross correlation function Φ₁₂ (u) are invariable characteristics of the transducers W₁ and W₂ which depend on the geometry of the transducers and thus suitable for characterizing said transducers.

This characterization of the transducers by the spatial weighting functions and the spatial cross correlation function is not restricted to the case where the detection region of each transducer is a measurement volume. It also applies to the case where the inhomogeneities utilized for the measurement of the velocity are disposed at the surface of the moving medium and the transducers each detect a predetermined surface area of the medium. This is for example the case in the measurement of the velocity of paper webs, textile webs and metal sheets in rolling mill trains. The detection region of each transducer is then not a volume but a surface region. The observations made above on the spatial weighting functions and their spatial correlation function apply without qualification to this case as well.

The diagrams A and B of FIG. 3 show the time variation of the output signals S₁ (t) and S₂ (t) of the transducers W₁, W₂. The fluctuations of these signals originate from the inhomogeneities of the moving medium passing through the detection regions of the transducers. Assuming that these inhomogeneities at least partially continue to exist on the path from the first to the second transducer, the fluctuations of the output signals of the two transducers caused by them have certain similarities which are offset with respect to each other by an interval of time which is equal to the travelling time of the inhomogeneity from the first to the second transducer. This fact is utilized for the velocity measurement by correlative linking of the two signals.

The diagram C of FIG. 3 shows the time cross correlation function R₁₂ (τ) of the two signals S₁ (t) and S₂ (t). The time cross correlation function has the mathematical form ##EQU2## This means that the instantaneous values of the signal S₂ (t) are multiplied by the instantaneous values of the signal S₁ (t) displaced by a displacement time τ and the mean value of the products is formed over the region of the observation time T. For each value of τ a discrete value of the time cross correlation function is obtained. In the use considered the cross correlation function has a maximum at a predetermined displacement time τ_(m) which is equal to the travelling time of the inhomogeneities of the medium from the transducer W₁ to the transducer W₂ i.e. when the following applies:

    τ.sub.M =D/V                                           (3)

With a known distance D from the displacement time τ_(m) the velocity v of the inhomogeneities can be directly calculated and as a rule is equal to the velocity of the medium.

For determining the cross correlation function the signals S₁ (t) and S₂ (t) are supplied after the necessary pretreatment in a signal processing circuit to a correlator 4. An evaluation circuit 5 connected to the correlator 4 investigates the cross correlation function for a minimum and outputs the displacement time τ_(m) corresponding to the travelling time or the velocity v calculated therefrom. These circuits and their modes of operation are known. Preferably, a suitably programmed microcomputer performs the functions of the correlator 4 and the evaluation circuit 5. In this case the signal processing circuit 2 includes an analog/digital converter which converts the analog output signals S₁ (t) and S₂ (t) to digital signals which are suitable for processing in the microcomputer.

FIG. 4 shows in a schematic representation corresponding to FIG. 1 a correlative velocity measuring arrangement which embodies the principle on which the invention is based. For the components and dimensions corresponding to the arrangement of FIG. 1 the same designations as in said Figure are used. The essential difference compared with the arrangement of FIG. 1 is that the detection regions of the two transducers W₁ and W₂ partially overlap. This must be achieved by a corresponding configuration of the transducers as indicated in the schematic representation of FIG. 1 by the transmitters T₁, T₂ and the receivers R₁, R₂ of the two transducers also partially mutually overlapping.

The partial overlapping of the detection regions of the transducers W₁, W₂ results in that the spatial weighting functions g₁ (z) and g₂ (z) illustrated in the diagrams A and B of FIG. 5 also partially overlap by an amount F. Accordingly, the spatial cross correlation function Φ₁₂ (u) illustrated in diagram C of FIG. 5 has for the spatial displacement u=0 a value different from zero and a gradientn different from the zero vector. The spatial cross correlation function assumes the value zero only at a negative spatial displacement u =-F and reaches its maximum at the positive spatial displacement u=D.

The diagrams A and B of FIG. 6 again show the time variation of the signals S₁ (t) and S₂ (t) which are emitted by the transducers W₁ and W₂ respectively of FIG. 4. These signals have fundamentally the same properties as the signals S₁ (t), S₂ (t) illustrated in FIG. 3 of the measuring arrangement of FIG. 1.

In contrast, the time cross correlation function R₁₂ (τ) illustrated in diagram C of FIG. 6 for the signals S₁ (t) and S₂ (t) differs from that of diagram C of FIG. 3 in that at the displacement time τ=0 it has a value different from zero and a gradient different from zero which is represented by the angle α between the tangent to the time cross correlation function at the intersection with the coordinate axis drawn in the point τ=0 and the horizontal.

The maximum of the time cross correlation function again lies at the displacement time τ_(m) =D/v and could, as in the arrangement of FIG. 1, be used for measuring the velocity of the moving medium. However, the particular feature of the measuring arrangement of FIG. 4 resides in that the measured value of the velocity is not derived from the displacement time τ_(m) corresponding to the maximum of the time cross correlation function but from the gradient of the time cross correlation function for the displacement time τ=0.

This measure is based on the recognition that a unique mathematically definable relationship exists between the gradient of the time cross correlation function at the displacement time τ=0 and the velocity of the medium. FIG. 7 shows the time cross correlation functions determined with the same measuring arrangement for various velocities v₁, v₂, v₃ of the medium. As can be seen, all the cross correlation functions intersect the ordinate axis passing through τ=0 at the same point but with different gradients. The gradient is the greater the greater the velocity. To illustrate this, it may be stated that for velocity changes the cross correlation function expands and contracts like an accordion.

The mathematical relationship between the velocity v and the gradient of the time cross correlation function is given by the following equation:

    ______________________________________                                          ##STR1##                      (4)                                             Wherein:                                                                       ______________________________________                                         Φ.sub.12 (0):                                                                         is the value of the spatial cross correlation                                  function for the spatial displacement u = 0;                         ##STR2##  is the gradient of the spatial cross cor- relation function                    for the spatial displace- ment u = 0;                               .R.sub.12 (0):                                                                            is the gradient of the time cross correlation                                  function for the displacement time τ = 0;                       R.sub.12 (0):                                                                             is the time cross correlation function for                                     the displacement time τ = 0;                                    μ.sub.1, μ.sub.2 :                                                                  are the mean values of the signals S.sub.1 (t) and                             S.sub.2 (t).                                                        ______________________________________                                    

The first factor on the right side of equation (4) is a geometrical term to be determined once which as was explained with reference to FIGS. 4 and 5 depends on the structure and arrangement of the transducers.

The second factor expresses the gradient of the time cross correlation function, the division by R₁₂ (0)-μ₁ μ₂ serving for normalization. When the term R₁₂ (0)-μ₁ μ₂ is zero the normalization can be made to the autopower of one of the two signals S₁ (t), S₂ (t) or to the root of the product of the autopowers of the two signals.

It is apparent from equation (4) that the gradient of the spatial cross correlation function must not vanish because it is in the denominator. This condition is only fulfilled if the detection regions of the transducers overlap in the manner explained with reference to FIGS. 4 and 5.

To determine the gradient of the time cross correlation function in the measuring arrangement of FIG. 4 the output signals S₁ (t) and S₂ (t) are supplied again after pretreatment in a signal processing circuit 2 to a correlator 4 which calculates the time cross correlation function. However, an evaluation circuit 6 is now associated with the correlator 4 which determines the gradient of the time cross correlation function for the displacement time τ=0 and derives therefrom the velocity of the medium. The correlator 4 and the evaluation circuit 6 may of course be formed in this case as well by a suitably programmed microcomputer.

There are numerous possibilities of constructing the transducers so that their detection regions overlap. FIGS. 8 and 9 show as example an optical measuring arrangement for measuring the flow velocity of a medium flowing through a plexiglass tube 10. The transducer W₁ includes as transmitter a light source 11 and as receiver a photodiode 12. The transducer W₂ includes as transmitter a light source 13 and as receiver a photodiode 14. Each transducer is so constructed that taking account of the lens action of the plexiglass tube 10 a substantially homogeneous weighting of the tube cross-section is achieved. The optical axes of the two transducers are arranged at a right angle. As FIG. 9 shows the light sources 11, 13 and the photodiodes 12, 14 of the two transducers are somewhat offset with respect to each other along the tube axis z so that the detection regions of the two transducers overlap by about half. For clarification the extent of the light sources 11, 13 and the photodiodes 12, 14 in the direction of the tube axis z has been shown exaggerated in FIG. 9. The overlapping of the detection regions is made possible in this case by the crossed arrangement of the transducers.

FIG. 8 also shows the configuration of the two signal processing circuits to which the output signals S₁ (t) and S₂ (t) of the transducers W₁ and W₂ are supplied. In each signal processing circuit the output signal of the associated transducer is first amplified in a preamplifier 15 and then filtered in a high-pass filter 16, the mean value of the signal being suppressed. After again amplifying in an amplifier 17 each signal is supplied to an analog/digital converter 18 which converts the mean-value-free analog signal to a digital signal suitable for processing in the microcomputer. Connected to the analog/digital converter 18 is a microcomputer 19 which performs the functions of the correlator 4 and the evaluation circuit 6 of FIG. 4.

Another possibility for implementing partially overlapping detection regions is for each transducer to consist of a plurality of transducer elements which are nested with the transducer elements of the other transducer. FIG. 10 shows as example of this a measuring arrangement with capacitive transducers for measuring the velocity of a medium flowing through a tube 20. The transducer W₁ consists of five transducer elements 21, 22, 23, 24, 25, each of which is formed in the usual manner by two electrodes diammetrically opposite each other at the periphery of the tube 20. The transducer elements 21, 22, 23, 24, 25 are arranged along the tube axis at intervals so that there are gaps between them. The transducer W₂ consists in the same manner of five transducer elements 31, 32, 33, 34, 35 which are arranged along the tube axis at intervals so that there are gaps between them. The transducer elements 31 and 32 of the transducer W₂ lie in the gaps between the transducer elements 23 and 24 and 24 and 25 respectively of the transducer W₁, thus giving the desired overlapping of the detection regions of the two transducers W₁ and W₂.

Instead of equipping each of the two transducers with their own transducer elements it is alternatively possible to combine the output signals of the same transducer elements in different manner in order to implement overlapping detection regions of two transducers. FIG. 11 shows a measuring arrangement comprising an array of photodiodes 41, 42, 43, 44, 45, 46, 47, 48 which are arranged along the movement direction z of the moving medium and receive the light of a common light source 40. Each photodiode forms in conjunction with the light source a transducer element and emits an electrical output signal S₄₁, S₄₂ . . . S₄₈ influenced by the inhomogeneities of the moving medium. The outputs of the photodiodes are connected to the inputs of two summation circuits 51 and 52 which combine the output signals of the photodiodes for forming the two signals S₁ (t) and S₂ (t) to be correlated with different sign rating. For example, the signals S₁ (t) and S₂ (t) are formed in the following manner:

    S.sub.1 (t)=+S.sub.41 +S.sub.42 -S.sub.43 -S.sub.44 +S.sub.45 +S.sub.46 -S.sub.47 -S.sub.48

    S.sub.2 (t)=-S.sub.41 +S.sub.42 +S.sub.43 -S.sub.44 -S.sub.45 +S.sub.46 +S.sub.47 -S.sub.48

This implementation of the overlapping detecting regions has the advantage that the signals S₁ (t) and S₂ (t) are free from mean values so that there is no necessity for a high-pass filtering. Furthermore, the effect of concentration fluctuations on the measurement result is suppressed. Of course, the same procedure may be adopted with acoustic, capacitive or other transducer elements instead of photodiodes.

Instead of the signal logic linking simultaneously with two summation circuits it can also be done in time multiplex with the same summation circuit.

The signals S₁ (t) and S₂ (t) obtained with the arrangements of FIG. 10 or FIG. 11 may then be further processed in the manner previously explained to form the time cross correlation function whose gradient is to be determined for the displacement time τ=0 and to derive therefrom the measured value of the velocity v.

Instead of carrying out these operations in a microcomputer it is also possible to obtain the result by direct processing of the electrical signals in a hardware circuit.

FIG. 12 shows an analog signal processing circuit 60 which is suitable for this purpose and comprises two inputs 61 and 62 to which are respectively supplied the output signals S₁ (t) and S₂ (t) of one of the previously described transducer systems. The analog signal S₁ (t) supplied to the input 61 is differentiated in a differentiating circuit 63 with respect to time. The output of the differentiating circuit 63 is connected to the one input of a multiplying circuit 64 which receives the signal S₂ (t) at the other input. The output signal of the multiplying circuit 64 is supplied via a low-pass filter 65 to the one input of a dividing circuit 66. The signal S₂ (t) applied to the input 62 is supplied to the two inputs of a second multiplying circuit 67 which thus furnishes at the output a signal corresponding to the square of the signal S₂ (t). This signal is applied via a second low-pass filter 68 to the other input of the dividing circuit 66.

The multiplication of the signals in the multiplying circuit 64 corresponds to the formation of the cross correlation function for the displacement time τ=0, the result, due to the preceding differentiation of the signal S₁ (t), corresponding directly to the gradient of the cross correlation function. The subsequent division by the square of the signal S₂ (t) gives the normalizing to the autopower of said signal. The output signal of the dividing circuit 66 thus represents the gradient of the normalized cross correlation function for the displacement time τ=0 and could for example serve in a correspondingly graduated display device 69 for direct display of the velocity v to be measured.

As in conventional correlative measuring methods it is not necessary to use the entire information contents of the analog output signals of the transducers to form and evaluate the cross correlation function. In many cases a so-called polarity correlation suffices in which the analog input signals are only binarized, i.e. quantized with a bit. This binarization can be used both in the signal processing by a microcomputer and in the signal processing by a hardware circuit. As example FIG. 13 shows a hardware circuit 70 which operates by the same principle as the analog signal processing circuit 60 of FIG. 12 but is formed for the processing of binarized signals. The circuit 70 receives at the input 71 the analog signal S₁ (t) and at the input 72 the analog signal S₂ (t). The analog signal S₁ (t) is first differentiated in a differentiating circuit 73 whose output signal is binarized in a digitizing circuit 74. The binarized output signal of the digitizing circuit 74 is applied to the one input of an XOR circuit 75. The analog signal S₂ (t) supplied to the input 72 is binarized after high-pass filtering in an high-pass filter 76 in a second digitizing circuit 77. The binarized output signal of the digitizing circuit 77 is applied to the second input of the XOR circuit 75. The logical combination or linking of the binary signals in the XOR circuit 75 corresponds in known manner to the correlative multiplication. A normalizing to the autopower is not necessary because the binarization automatically gives the normalization to the root of the product of the autopowers of the two signals. The output signal of the XOR circuit 75 thus represents after filtering in a low-pass filter 78 the gradient of the normalized cross correlation function for the displacement time τ=0 and can be supplied to a suitably graduated display device 79 for direct display of the velocity to be measured.

The first moment of the cross correlation density spectrum of the signals S₁ (t) and S₂ (t) is mathematically equivalent to the gradient of the normalized cross correlation function for the displacement time τ=0. It is therefore also possible to program the microcomputer or the hardware circuit used in its place in such a manner that a result is obtained which corresponds to the first moment of the cross power density spectrum. It is then possible to derive from this value the velocity v to be measured in the same manner as from the gradient of the normalized cross correlation function for the displacement τ=0. 

We claim:
 1. Arrangement for the contactless measurement of the velocity of a moving medium comprising two transducers having detection regions which are offset with respect to each other in the direction of movement of the medium and which generate electrical output signals influenced by the spatial position of inhomogeneities of the moving medium, the output signals generated in accordance with a spatial weighting function of each transducer, the detection regions of the two transducers partially overlapping in such a manner that the gradient of the spatial cross correlation function of the spatial weighting functions for the spatial displacement zero is different from the zero vector, and means for calculating the time cross correlation function of the two signals and for determining the gradient of the time cross correlation function of the two signals for the displacement time zero to determine the velocity of the moving medium.
 2. Arrangement according to claim 1 in which the two transducers are partially mutually overlapping and are offset with respect to each other in the direction of movement, and wherein each transducer has a detection axis and the transducers are oriented such that the detection axes are disposed at a substantially right angle to each other.
 3. Arrangement according to claim 1 in which each transducer consists of a plurality of transducer elements arranged along the direction of movement, and the overlapping detecting regions are obtained by arranging some transducer elements of one transducer between some transducer elements of the other transducer.
 4. Arrangement according to claim 1 in which the overlapping detecting regions of the two transducers are implemented by combining selected output signals of a plurality of transducer elements arranged along the direction of movement in a predetermined manner.
 5. Arrangement for the contactless measurement of the velocity of a moving medium comprising two transducers having detection regions which are offset with respect to each other in the direction of movement of the medium and which generate electrical output signals influenced by the spatial position of inhomogeneities of the moving medium, the output signals generated in accordance with a spatial weighting function of each transducer, the detection regions of the two transducers partially overlapping in such a manner that the gradient of the spatial cross correlation function of the spatial weighting functions for the spatial displacement zero is different from the zero vector, and means for calculating the first moment of the cross power density spectrum of the two signals to determine the velocity of the moving medium.
 6. Arrangement according to claim 5 in which the two transducers are partially mutually overlapping and are offset with respect to each other in the direction of movement, and wherein each transducer has a detection axis and the transducers are oriented such that the detection axes are disposed at a substantially right angle to each other.
 7. Arrangement according to claim 5 in which each transducer consists of a plurality of transducer elements arranged along the direction of movement, and the overlapping detecting regions are obtained by arranging some transducer elements of one transducer between some transducer elements of the other transducer.
 8. Arrangement according to claim 5 in which the overlapping detecting regions of the two transducers are implemented by combining selected output signals of a plurality of transducer elements arranged along the direction of movement in a predetermined manner. 